KNOTS WITH UNIQUE MINIMAL GENUS SEIFERT SURFACE AND DEPTH OF KNOTS

MARK BRITTENHAM

doi:10.1142/s0218216508006129

KNOTS WITH UNIQUE MINIMAL GENUS SEIFERT SURFACE AND DEPTH OF KNOTS

Journal of Knot Theory and Its Ramifications ◽

10.1142/s0218216508006129 ◽

2008 ◽

Vol 17 (03) ◽

pp. 315-335

Author(s):

MARK BRITTENHAM

Keyword(s):

Compact Leaf ◽

Seifert Surface ◽

Minimal Genus

We describe a procedure for creating infinite families of hyperbolic knots, each having unique minimal genus Seifert surface which cannot be the sole compact leaf of a depth one foliation.

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A distance for circular Heegaard splittings

Journal of Knot Theory and Its Ramifications ◽

10.1142/s0218216519500597 ◽

2019 ◽

Vol 28 (09) ◽

pp. 1950059

Author(s):

Kevin Lamb ◽

Patrick Weed

Keyword(s):

Critical Points ◽

Morse Function ◽

Heegaard Splitting ◽

Heegaard Splittings ◽

Seifert Surface ◽

Singular Foliation ◽

Incompressible Surfaces ◽

Minimal Genus ◽

Seifert Surfaces ◽

Index 2

For a knot [Formula: see text], its exterior [Formula: see text] has a singular foliation by Seifert surfaces of [Formula: see text] derived from a circle-valued Morse function [Formula: see text]. When [Formula: see text] is self-indexing and has no critical points of index 0 or 3, the regular levels that separate the index-1 and index-2 critical points decompose [Formula: see text] into a pair of compression bodies. We call such a decomposition a circular Heegaard splitting of [Formula: see text]. We define the notion of circular distance (similar to Hempel distance) for this class of Heegaard splitting and show that it can be bounded under certain circumstances. Specifically, if the circular distance of a circular Heegaard splitting is too large: (1) [Formula: see text] cannot contain low-genus incompressible surfaces, and (2) a minimal-genus Seifert surface for [Formula: see text] is unique up to isotopy.

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SURGERY AND FOLIATIONS OF KNOT COMPLEMENTS

Journal of Knot Theory and Its Ramifications ◽

10.1142/s0218216593000210 ◽

1993 ◽

Vol 02 (04) ◽

pp. 369-397 ◽

Cited By ~ 1

Author(s):

JOHN CANTWELL ◽

LAWRENCE CONLON

Keyword(s):

Unit Ball ◽

Lattice Points ◽

Compact Leaf ◽

Minimal Genus ◽

Relative Homology ◽

Topological Description ◽

Seifert Surfaces ◽

Knot Complements ◽

Interesting Class

An interesting class of knots have complement with a remarkably simple topological description. This class includes all the arborescent knots with only even weights hence, in particular, the two bridge knots and many knots of ten or fewer crossings. For these knots, there are choices of minimal genus Seifert surfaces S such that all taut, depth one foliations of the knot complement, having S as sole compact leaf, can be classified up to isotopy. These foliations correspond exactly to the lattice points over the open faces of the unit ball in a Thurston-like norm on the relative homology of the complement of S.

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Identifying non-pseudo-alternating knots by using the free factor property of minimal genus Seifert surfaces

Journal of Knot Theory and Its Ramifications ◽

10.1142/s0218216521500723 ◽

2021 ◽

Author(s):

Keisuke Himeno ◽

Masakazu Teragaito

Keyword(s):

Seifert Surface ◽

Major Difficulty ◽

Flat Surfaces ◽

Minimal Genus ◽

Pretzel Knots ◽

Seifert Surfaces ◽

Manifold Theory ◽

Knots And Links

Pseudo-alternating knots and links are defined constructively via their Seifert surfaces. By performing Murasugi sums of primitive flat surfaces, such a knot or link is obtained as the boundary of the resulting surface. Conversely, it is hard to determine whether a given knot or link is pseudo-alternating or not. A major difficulty is the lack of criteria to recognize whether a given Seifert surface is decomposable as a Murasugi sum. In this paper, we propose a new idea to identify non-pseudo-alternating knots. Combining with the uniqueness of minimal genus Seifert surface obtained through sutured manifold theory, we demonstrate that two infinite classes of pretzel knots are not pseudo-alternating.

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KNOTTED SEIFERT SURFACES AND UNKNOTTED SEIFERT SURFACES

Journal of Knot Theory and Its Ramifications ◽

10.1142/s0218216508006038 ◽

2008 ◽

Vol 17 (02) ◽

pp. 141-155

Author(s):

YUKIHIRO TSUTSUMI

Keyword(s):

Seifert Surface ◽

Minimal Genus ◽

Seifert Surfaces ◽

Genus One

It is known that free genus one knots do not admit Seifert surfaces with hyperbolic exteriors. In this paper, for any integer g ≥ 2, we exhibit a knot of genus g which bounds a minimal genus Seifert surface with hyperbolic exterior and a minimal genus free Seifert surface.

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SEIFERT SURFACES, COMMUTATORS AND VASSILIEV INVARIANTS

Journal of Knot Theory and Its Ramifications ◽

10.1142/s0218216507005816 ◽

2007 ◽

Vol 16 (10) ◽

pp. 1295-1329

Author(s):

E. KALFAGIANNI ◽

XIAO-SONG LIN

Keyword(s):

Fundamental Group ◽

Lower Central Series ◽

Central Series ◽

Seifert Surface ◽

Vassiliev Invariants ◽

Seifert Surfaces

We show that the Vassiliev invariants of a knot K, are obstructions to finding a regular Seifert surface, S, whose complement looks "simple" (e.g. like the complement of a disc) to the lower central series of its fundamental group. We also conjecture a characterization of knots whose invariants of all orders vanish in terms of their Seifert surfaces.

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THE MINIMAL GENUS PROBLEM IN RULED MANIFOLDS

Journal of Knot Theory and Its Ramifications ◽

10.1142/s021821650800621x ◽

2008 ◽

Vol 17 (04) ◽

pp. 471-482

Author(s):

XU-AN ZHAO ◽

HONGZHU GAO

Keyword(s):

Cohomology Class ◽

Standard Form ◽

Geometric Construction ◽

Diffeomorphism Group ◽

Minimal Genus ◽

Adjunction Formula ◽

Embedded Surfaces

In this paper, we consider the minimal genus problem in a ruled 4-manifold M. There are three key ingredients in the studying, the action of diffeomorphism group of M on H2(M,Z), the geometric construction of surfaces representing a cohomology class and the generalized adjunction formula. At first, we discuss the standard form (see Definition 1.1) of a class under the action of diffeomorphism group on H2(M,Z), we prove the uniqueness of the standard form. Then we construct some embedded surfaces representing the standard forms of some positive classes, the generalized adjunction formula is used to show that these surfaces realize the minimal genera.

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Minimal genus of a multiple and Frobenius number of a quotient of a numerical semigroup

International Journal of Algebra and Computation ◽

10.1142/s0218196715500290 ◽

2015 ◽

Vol 25 (06) ◽

pp. 1043-1053 ◽

Cited By ~ 4

Author(s):

Francesco Strazzanti

Keyword(s):

Positive Integer ◽

Numerical Semigroup ◽

Frobenius Number ◽

Numerical Semigroups ◽

Minimal Genus

Given two numerical semigroups S and T and a positive integer d, S is said to be one over d of T if S = {s ∈ ℕ | ds ∈ T} and in this case T is called a d-fold of S. We prove that the minimal genus of the d-folds of S is [Formula: see text], where g and f denote the genus and the Frobenius number of S. The case d = 2 is a problem proposed by Robles-Pérez, Rosales, and Vasco. Furthermore, we find the minimal genus of the symmetric doubles of S and study the particular case when S is almost symmetric. Finally, we study the Frobenius number of the quotient of some families of numerical semigroups.

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